Bertrand's paradox on a monitor
Abstract
We investigate Bertrand's probabilistic paradox through the lens of discrete geometry and old-fashioned but reliable discrete probability. We approximate the plane unit circle with 1/n times 1/n boxes and count the pairs of boxes separated by distance more than 3. For n∞ the proportion of such pairs goes to 1+38-π(2-3)96=0.33273…\;.
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